How many random edges make a dense hypergraph non-2-colorable?

Abstract

We study a model of random uniform hypergraphs, where a random instance is obtained by adding random edges to a large hypergraph of a given density. We obtain a tight bound on the number of random edges required to ensure non-2-colorability. We prove that for any k-uniform hypergraph with Omega(nk-epsilon) edges, adding omega(nk epsilon/2) random edges makes the hypergraph almost surely non-2-colorable. This is essentially tight, since there is a 2-colorable hypergraph with Omega(nk-ε) edges which almost surely remains 2-colorable even after adding o(nk ε / 2) random edges.